Proceedings of the American Mathematical Society

Author(s): Matthew Miller; Rafael H. Villarreal
Journal: Proc. Amer. Math. Soc. 124 (1996), 377-382.
MSC (1991): Primary 13H10; Secondary 13D40
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Abstract: Assume $R$

is a polynomial ring over a field and $I$

is a homogeneous Gorenstein ideal of codimension $g\ge3$ and initial degree $p\ge2$ . We prove that the number of minimal generators $\nu(I_p)$ of $I$

that are of degree $p$

is bounded above by $\nu_0=\binom{p+g-1}{g-1}-\binom{p+g-3}{g-1}$ , which is the number of minimal generators of the defining ideal of the extremal Gorenstein algebra of codimension $g$

and initial degree $p$

. Further, $I$

is itself extremal if $\nu(I_p)=\nu_0$ .

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Retrieve articles in Proceedings of the American Mathematical Society with MSC (1991): 13H10, 13D40

Matthew Miller
Affiliation: Department of Mathematics, University of South Carolina, Columbia, South Carolina 29208
Email: miller@math.sc.edu

Rafael H. Villarreal
Affiliation: Departamento de Matemáticas Escuela Superior de Física y Matemáticas, Instituto Politécnico Nacional, Unidad Adolfo López Mateos, México, D.F. 07300
Email: vila@esfm.ipn.mx

DOI: 10.1090/S0002-9939-96-03095-X
PII: S 0002-9939(96)03095-X
Received by editor(s): June 6, 1994
Received by editor(s) in revised form: August 25, 1994
Additional Notes: The first author was supported by the National Science Foundation.
The second author was partially supported by COFAA--IPN, CONACyT and SNI, México
Communicated by: Wolmer V. Vasconcelos
Copyright of article: Copyright 1996, American Mathematical Society

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